Proof of Nuprl Lemma : uniform-Kan-filler

Step * 1 1 1 of Lemma uniform-Kan-filler_wf

1. X : CubicalSet

2. filler : I:(Cname List) ⟶ J:(nameset(I) List) ⟶ x:nameset(I) ⟶ i:ℕ2 ⟶ open_box(X;I;J;x;i) ⟶ X(I)

3. I : Cname List
4. J : nameset(I) List
5. x : Cname
6. (x ∈ I)
7. i : ℕ2
8. bx : I-face(X;I) List
9. adjacent-compatible(X;I;bx)
10. ¬(x ∈ J)
11. l_subset(Cname;J;I)
12. ∀y:nameset(J). ∀c:ℕ2. (∃f∈bx. face-name(f) = <y, c> ∈ (nameset(I) × ℕ2))
13. (∃f∈bx. face-name(f) = <x, i> ∈ (nameset(I) × ℕ2))
14. (∀f∈bx.¬(face-name(f) = <x, 1 - i> ∈ (nameset(I) × ℕ2)))
15. (∀f∈bx.(fst(f) ∈ [x / J]))
16. (∀f1,f2∈bx. ¬(face-name(f1) = face-name(f2) ∈ (nameset(I) × ℕ2)))
17. K : Cname List
18. f : name-morph(I;K)
19. ∀i:nameset(I). ((i ∈ J) ⇒ (↑isname(f i)))
20. ↑isname(f x)
21. f x ∈ nameset(K)
22. x1 : Cname
23. (x1 ∈ [x / J])
⊢ (x1 ∈ filter(λx.isname(f x);I))
BY
{ (((RW ListC (-1) THENM D -1) THENA Auto) THEN RW ListC 0 THEN Auto) }

Latex:

Latex:
1. X : CubicalSet 2. filler : I:(Cname List) {}\mrightarrow{} J:(nameset(I) List) {}\mrightarrow{} x:nameset(I) {}\mrightarrow{} i:\mBbbN{}2 {}\mrightarrow{} open\_box(X;I;J;x;i) {}\mrightarrow{} X(I) 3. I : Cname List 4. J : nameset(I) List 5. x : Cname 6. (x \mmember{} I) 7. i : \mBbbN{}2 8. bx : I-face(X;I) List 9. adjacent-compatible(X;I;bx) 10. \mneg{}(x \mmember{} J) 11. l\_subset(Cname;J;I) 12. \mforall{}y:nameset(J). \mforall{}c:\mBbbN{}2. (\mexists{}f\mmember{}bx. face-name(f) = <y, c>) 13. (\mexists{}f\mmember{}bx. face-name(f) = <x, i>) 14. (\mforall{}f\mmember{}bx.\mneg{}(face-name(f) = <x, 1 - i>)) 15. (\mforall{}f\mmember{}bx.(fst(f) \mmember{} [x / J])) 16. (\mforall{}f1,f2\mmember{}bx. \mneg{}(face-name(f1) = face-name(f2))) 17. K : Cname List 18. f : name-morph(I;K) 19. \mforall{}i:nameset(I). ((i \mmember{} J) {}\mRightarrow{} (\muparrow{}isname(f i))) 20. \muparrow{}isname(f x) 21. f x \mmember{} nameset(K) 22. x1 : Cname 23. (x1 \mmember{} [x / J]) \mvdash{} (x1 \mmember{} filter(\mlambda{}x.isname(f x);I)) By Latex: (((RW ListC (-1) THENM D -1) THENA Auto) THEN RW ListC 0 THEN Auto) Home Index